Complete Characterization on Maximum Pairwise Cross Intersecting Families (I)

Abstract

The families A and B are cross intersecting if A B for any A∈ A and B∈ B. Let t≥ 2 and k1≥ k2≥ ·s ≥ kt. We say that (F1, …, Ft) is an (n, k1, …, kt)-cross intersecting system if F1 ⊂eq[n] k1, … ,Ft ⊂eq[n] kt are non-empty pairwise cross intersecting families. Let M(n,k1,… ,kt) denote the maximum sum of sizes of families of an (n,k1,… ,kt)-cross intersecting system. The case t=2 was studied by Frankl--Tokushige. Solving a problem of Shi-Frankl-Qian, Huang-Peng-Wang and Zhang-Feng independently determined M(n, k1, …, kt) for all n≥ k1+k2.